Realizing arbitrary d-dimensional dynamics by renormalization of Cd-perturbations of identity
Abstract
Any Cd conservative map f of the d-dimensional unit ball Bd can be realized by renormalized iteration of a Cd perturbation of identity: there exists a conservative diffeomorphism of Bd, arbitrarily close to identity in the Cd topology, that has a periodic disc on which the return dynamics after a Cd change of coordinates is exactly f.
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